Add to ORKGSome applications of the odd Poisson bracket developed by Kharkov's theorists are represented, including the reformulation of classical Hamiltonian dynamics, the description of hydrodynamics as a Hamilton system by means of the odd bracket and the dynamics formulation with the Grassmann-odd Lagrangian. Quantum representations of the odd bracket are also constructed and applied for the quantization of classical systems based on the odd bracket and for the realization of the idea of a composite spinor structure of space-time. At last, the linear odd bracket, corresponding to a semi-simple Lie group, is introduced on the Grassmann algebra
We introduce q- and signed analogues of several constructions in and around the theory of symmetric ...
We introduce q- and signed analogues of several constructions in and around the theory of symmetric ...
Two supersymmetric classical mechanical systems are discussed. Concrete realizations are obtained by...
On a Poisson manifold, the divergence of a hamiltonian vector field is a derivation of the algebra o...
A linear degenerate odd Poisson bracket (antibracket) realized solely on Grassmann variables is pres...
A carefully motivated symmetric variant of the Poisson bracket in ordinary (not Grassmann) phase spa...
A carefully motivated symmetric variant of the Poisson bracket in ordinary (not Grassmann) phase spa...
The principle of invariance of the c-number symmetric bracket is used to derive both the quantum ope...
The principle of invariance of the c-number symmetric bracket is used to derive both the quantum ope...
Journal ArticleWe briefly discuss some algebraic and geometric aspects of the generalized Poisson br...
By making use of the Weyl-Wigner-Groenewold-Moyal association rules, a commutative product and a new...
were introduced and studied in [1] and [2] to construct a theory of conservative systems of hydrodyn...
We construct a nonskew symmetric version of a Poisson bracket on the algebra of smooth functions on ...
The internal space-time symmetry and simple supersymmetry of relativistic particles are briefly disc...
We construct a nonskew symmetric version of a Poisson bracket on the algebra of smooth functions on ...
We introduce q- and signed analogues of several constructions in and around the theory of symmetric ...
We introduce q- and signed analogues of several constructions in and around the theory of symmetric ...
Two supersymmetric classical mechanical systems are discussed. Concrete realizations are obtained by...
On a Poisson manifold, the divergence of a hamiltonian vector field is a derivation of the algebra o...
A linear degenerate odd Poisson bracket (antibracket) realized solely on Grassmann variables is pres...
A carefully motivated symmetric variant of the Poisson bracket in ordinary (not Grassmann) phase spa...
A carefully motivated symmetric variant of the Poisson bracket in ordinary (not Grassmann) phase spa...
The principle of invariance of the c-number symmetric bracket is used to derive both the quantum ope...
The principle of invariance of the c-number symmetric bracket is used to derive both the quantum ope...
Journal ArticleWe briefly discuss some algebraic and geometric aspects of the generalized Poisson br...
By making use of the Weyl-Wigner-Groenewold-Moyal association rules, a commutative product and a new...
were introduced and studied in [1] and [2] to construct a theory of conservative systems of hydrodyn...
We construct a nonskew symmetric version of a Poisson bracket on the algebra of smooth functions on ...
The internal space-time symmetry and simple supersymmetry of relativistic particles are briefly disc...
We construct a nonskew symmetric version of a Poisson bracket on the algebra of smooth functions on ...
We introduce q- and signed analogues of several constructions in and around the theory of symmetric ...
We introduce q- and signed analogues of several constructions in and around the theory of symmetric ...
Two supersymmetric classical mechanical systems are discussed. Concrete realizations are obtained by...